Normalized distance Laplacian energy change due to edge deletion in complete graph and complete multipartite graph

Document Type : Research Paper

Authors

1 Mathematics, St Aloysious College, Edathua

2 SB College Chganganachery

Abstract

Let G be a connected graph with a distance matrix D. The eigenvalues of D forms the distance spectrum or D−spectrum
of G. The transmission of a vertex v in G is the sum of the distances from v to all other vertices of G and T (G) is the diagonal matrix with transmission of the vertices as diagonal entries. The distance Laplacian matrix is defined as DL(G)=T(G)−D(G) and the normalized distance Laplacian matrix as DL(G)=T (G)−1/2DL(G)T (G)−1/2. The normalized-distance Laplacian energy is defined as DLE(G)=∑i=1niL−1|. Let DLE(G − e) be the normalized Laplacian energy of distance when an edge e is removed. In this paper we are studying the Normalized Distance Laplacian
energy change due to an edge deletion.

Keywords

Main Subjects

References

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Journal of Hyperstructures
Volume 15, Issue 1
June 2026
Pages 49-64

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